<?xml version="1.0" encoding="UTF-8"?><!DOCTYPE article  PUBLIC "-//NLM//DTD Journal Publishing DTD v3.0 20080202//EN" "http://dtd.nlm.nih.gov/publishing/3.0/journalpublishing3.dtd"><article xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" dtd-version="3.0" xml:lang="en" article-type="research article"><front><journal-meta><journal-id journal-id-type="publisher-id">AM</journal-id><journal-title-group><journal-title>Applied Mathematics</journal-title></journal-title-group><issn pub-type="epub">2152-7385</issn><publisher><publisher-name>Scientific Research Publishing</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.4236/am.2013.42062</article-id><article-id pub-id-type="publisher-id">AM-28422</article-id><article-categories><subj-group subj-group-type="heading"><subject>Articles</subject></subj-group><subj-group subj-group-type="Discipline-v2"><subject>Physics&amp;Mathematics</subject></subj-group></article-categories><title-group><article-title>
 
 
  Common Fixed Point Theorems of Multi-Valued Maps in Ultra Metric Space
 
</article-title></title-group><contrib-group><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>iulin</surname><given-names>Wang</given-names></name><xref ref-type="aff" rid="aff1"><sup>1</sup></xref></contrib><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>Meimei</surname><given-names>Song</given-names></name><xref ref-type="aff" rid="aff1"><sup>1</sup></xref><xref ref-type="corresp" rid="cor1"><sup>*</sup></xref></contrib></contrib-group><aff id="aff1"><addr-line>College of Science, Tianjin University of Technology, Tianjin, China</addr-line></aff><author-notes><corresp id="cor1">* E-mail:<email>songmeimei@tjut.edu.cn(MS)</email>;</corresp></author-notes><pub-date pub-type="epub"><day>22</day><month>02</month><year>2013</year></pub-date><volume>04</volume><issue>02</issue><fpage>417</fpage><lpage>420</lpage><history><date date-type="received"><day>November</day>	<month>30,</month>	<year>2012</year></date><date date-type="rev-recd"><day>January</day>	<month>9,</month>	<year>2013</year>	</date><date date-type="accepted"><day>January</day>	<month>16,</month>	<year>2013</year></date></history><permissions><copyright-statement>&#169; Copyright  2014 by authors and Scientific Research Publishing Inc. </copyright-statement><copyright-year>2014</copyright-year><license><license-p>This work is licensed under the Creative Commons Attribution International License (CC BY). http://creativecommons.org/licenses/by/4.0/</license-p></license></permissions><abstract><p>
 
 
   We establish some results on coincidence and common fixed point for a two pair of multi-valued and single-valued maps in ultra metric spaces. 
 
</p></abstract><kwd-group><kwd>Multi-Valued Maps; Coincidence Point; Common Fixed Point</kwd></kwd-group></article-meta></front><body><sec id="s1"><title>1. Introduction</title><p>Roovij in [<xref ref-type="bibr" rid="scirp.28422-ref1">1</xref>] introduced the concept of ultra metric space. Later, C. Petalas, F. Vidalis [<xref ref-type="bibr" rid="scirp.28422-ref2">2</xref>] and Ljiljana Gajic [<xref ref-type="bibr" rid="scirp.28422-ref3">3</xref>] studied fixed point theorems of contractive type maps on a spherically complete ultra metric spaces which are generalizations of the Banach fixed point theorems. In [<xref ref-type="bibr" rid="scirp.28422-ref4">4</xref>] K. P. R. Rao, G. N. V. Kishore and T. Ranga Rao obtained two coincidence point theorems for three or four self maps in ultra metric space.</p><p>J. Kubiaczyk and A. N. Mostafa [<xref ref-type="bibr" rid="scirp.28422-ref5">5</xref>] extend the fixed point theorems from the single-valued maps to the setvalued contractive maps. Then Gajic [<xref ref-type="bibr" rid="scirp.28422-ref6">6</xref>] gave some generalizations of the result of [<xref ref-type="bibr" rid="scirp.28422-ref3">3</xref>]. Again, Rao [<xref ref-type="bibr" rid="scirp.28422-ref7">7</xref>] proved some common fixed point theorems for a pair of maps of Jungck type on a spherically complete ultra metric space.</p><p>In this article, we are going to establish some results on coincidence and common fixed point for two pair of multi-valued and single-valued maps in ultra metric spaces.</p></sec><sec id="s2"><title>2. Basic Concept</title><p>First we introducing a notation.</p><p>Let <img src="22-7401296\c9d11fcb-515c-4b07-8209-cada62947356.jpg" /> denote the class of all non empty compact subsets of<img src="22-7401296\fc1be198-c1cd-4263-ad87-b158fc60c7d1.jpg" />. For<img src="22-7401296\8c5eddec-63a4-424b-a7ee-48187a5eb78f.jpg" />, the Hausdorff metric is defined as</p><p><img src="22-7401296\0ff8fecf-1974-428f-84b4-49d0b235867c.jpg" /></p><p>where<img src="22-7401296\dd35b0e0-2b6e-4d6f-945b-0e2a2b40b3d0.jpg" />.</p><p>The following definitions will be used later.</p><p>Definition 2.1 ([<xref ref-type="bibr" rid="scirp.28422-ref1">1</xref>]) Let<img src="22-7401296\c25e6200-4ace-4b13-a112-a4d28b116667.jpg" />be a metric space. If the metric <img src="22-7401296\cb3d6702-e2e1-407a-89c3-0afe8f4bc78a.jpg" /> satisfies strong triangle inequality</p><p><img src="22-7401296\9cc17c4c-f778-4ffc-b93e-5abe82b69d48.jpg" /></p><p>Then <img src="22-7401296\9a10e6c5-6a0e-4893-bfd2-5c618d9c586a.jpg" /> is called an ultra metric on <img src="22-7401296\7cfd2eeb-38a4-4204-b9ad-5e7a168671c0.jpg" /> and <img src="22-7401296\4834f9db-b1b1-4214-abf8-0792806d07e6.jpg" /> is called an ultra metric space.</p><p>Example. Let<img src="22-7401296\61997a59-a0a7-421d-afbf-177c97756b92.jpg" />,<img src="22-7401296\dc412867-47bd-4357-b6a4-31f30d1f15fc.jpg" /> , then</p><p><img src="22-7401296\f350a975-995a-4310-946e-7c2ce795e2b4.jpg" />is a ultra metric space.</p><p>Definition 2.2 ([<xref ref-type="bibr" rid="scirp.28422-ref1">1</xref>]) An ultra metric space is said to be spherically complete if every shrinking collection of balls in <img src="22-7401296\1dd9245c-d331-4ad1-8d5e-c4b1835d8c18.jpg" /> has a non empty intersection.</p><p>Definition 2.3 An element<img src="22-7401296\0214b909-e1d3-4bdd-8390-af499ca6ed03.jpg" />is said to be a coincidence point of <img src="22-7401296\399ad496-a7ee-41d7-a59c-0215616aab5f.jpg" /> and <img src="22-7401296\26968235-534f-477b-b0c9-7cb041021908.jpg" /> if<img src="22-7401296\874cae13-20cf-4a17-aae3-148ac19527f2.jpg" />. We denote</p><p><img src="22-7401296\af317dad-cc38-4f89-8e50-a42b70485769.jpg" /></p><p>the set of coincidence points of <img src="22-7401296\70751aed-24a6-4141-a3ab-2f066656ee31.jpg" />and<img src="22-7401296\64654e31-912a-45a2-8357-3e62cdab0069.jpg" />.</p><p>Definition 2.4 ([<xref ref-type="bibr" rid="scirp.28422-ref7">7</xref>]) Let <img src="22-7401296\f37a30f2-c2e2-4762-aadc-04406a7afb14.jpg" /> be an ultra metric space, <img src="22-7401296\35639505-f8ca-4460-a234-565721b25f3c.jpg" />and<img src="22-7401296\83049de4-910c-43b5-8858-a8b8f78a858f.jpg" />. <img src="22-7401296\ab1dd65f-f279-4382-a302-c4f43a3b6b90.jpg" />and <img src="22-7401296\ec614850-5db7-484e-8838-8bd3a8baf8af.jpg" /> are said to be coincidentally commuting at <img src="22-7401296\44019cba-4b12-405a-94a3-420dcd2b0bf0.jpg" /> if <img src="22-7401296\6dd34ee3-2e03-44d7-880c-fd8a108d1d90.jpg" /> implies<img src="22-7401296\e6be47fd-7be0-4df4-b6e7-7d4620c3ca1f.jpg" />.</p><p>Definition 2.5 ([<xref ref-type="bibr" rid="scirp.28422-ref8">8</xref>]) An element <img src="22-7401296\862e7420-b8cd-4f05-9595-1fc6fe9db80c.jpg" /> is a common fixed point of <img src="22-7401296\18151dfd-ddfa-40bd-961c-dc3c80182d57.jpg" /> and <img src="22-7401296\e7e0f99d-ce9c-4fa0-95a7-13e5e9546f24.jpg" /> if <img src="22-7401296\d722222b-2ff5-4b57-a4de-74a43c0c3786.jpg" />.</p></sec><sec id="s3"><title>3. Main Results</title><p>The following results are the main result of this paper.</p><p>Theorem 3.1 Let <img src="22-7401296\41d9c1c8-5e87-4596-806f-cba94da282bc.jpg" /> be an ultra metric space. Let <img src="22-7401296\bf6193fd-3cd3-41e1-af50-1cf6386e4dea.jpg" /> be a pair of multi-valued maps and <img src="22-7401296\1ace44e3-86a0-4acd-9972-80a483c06b77.jpg" /> a pair of single-valued maps satisfying</p><p>(a) <img src="22-7401296\9bb5657f-d0d1-49a8-ab09-6f5bec119947.jpg" />is spherically complete;</p><disp-formula id="scirp.28422-formula70152"><label>(b)</label><graphic position="anchor" xlink:href="22-7401296\de17d3ce-56d5-4e80-8a29-67f686e85e04.jpg"  xlink:type="simple"/></disp-formula><p>for all<img src="22-7401296\6b983a56-4afc-4b78-999c-44fa6ccdec62.jpg" />, with<img src="22-7401296\1f431ac2-efaf-4cd3-9bac-dfc941d445a0.jpg" />;</p><p>(c) <img src="22-7401296\d0d153be-de7e-4106-925c-69fd9c6214c3.jpg" /> <img src="22-7401296\f2738aed-b874-4d22-ae2d-32ca6b5e3f8b.jpg" />;</p><p>(d)<img src="22-7401296\1f1c2ed6-be07-4034-8790-12d011f282f6.jpg" />.</p><p>Then there exist point <img src="22-7401296\fa96dee7-f18a-4238-910d-761ceccc08e7.jpg" /> and <img src="22-7401296\7d36aaf2-f7bc-48e7-ba20-39a8cb57f123.jpg" /> in<img src="22-7401296\89816aa6-7fd0-4304-b6b2-9e36ee6213cb.jpg" />, such that</p><p><img src="22-7401296\8b94edf3-7482-4a7c-bc10-ba8a55061bc8.jpg" />.</p><p>Proof. Let</p><p><img src="22-7401296\b6fa3ffc-28c8-42f5-b7e6-bf3b1a490d82.jpg" /></p><p>denote the closed sphere with centered<img src="22-7401296\21e1916f-9e20-41dd-ad76-250e5aff12c2.jpg" />and radius</p><p><img src="22-7401296\7faffd57-6837-48b7-a63b-08078cf9a492.jpg" />.</p><p>Let<img src="22-7401296\986a282c-e6fe-4148-b9da-169272ded566.jpg" /> be the collection of all the spheres for all<img src="22-7401296\1996ce38-2989-4303-bb89-3b4b5914256f.jpg" />.</p><p>Then the relation</p><p><img src="22-7401296\7fd6cc5a-3a9a-49f2-9137-6a77fbbd8247.jpg" />if <img src="22-7401296\79e8b624-7d45-4f64-b355-cc30b0b24942.jpg" /></p><p>is a partial order on<img src="22-7401296\68debd69-8aee-4451-a3e8-ca6181683d99.jpg" />.</p><p>Consider a totally ordered sub family <img src="22-7401296\a581b5f5-8323-4dcb-87e4-1c15c071be58.jpg" /> of<img src="22-7401296\d828c245-6a55-4acd-b861-5351dccca318.jpg" />.</p><p>Since <img src="22-7401296\f00cb6b0-50be-4211-bce3-bd7897fa7e77.jpg" /> is spherically complete, we have</p><p><img src="22-7401296\cf73958b-df65-4d3e-86c8-93f6ed6b3d1e.jpg" /></p><p>Let <img src="22-7401296\1c6330ee-718b-4948-8e4a-bf9e4241d69d.jpg" /> where <img src="22-7401296\642124a0-fe52-48b0-b321-7adc6d33583c.jpg" /> and<img src="22-7401296\6f28aae3-a2c9-4c69-956d-0d637b97203d.jpg" />.</p><p>Then<img src="22-7401296\817ede1e-3ac4-47e5-8f87-a7f78f3357d6.jpg" />. Hence</p><disp-formula id="scirp.28422-formula70153"><label>(1)</label><graphic position="anchor" xlink:href="22-7401296\ad8e85e0-93ca-4efd-b513-9678415d7a73.jpg"  xlink:type="simple"/></disp-formula><p>If <img src="22-7401296\40294a2d-67f2-49ab-af6e-a4d3da0d18c5.jpg" /> then<img src="22-7401296\43ee41f2-c9ca-419d-b698-ddfa785dc717.jpg" />. Assume that<img src="22-7401296\2d42baed-6ce8-4452-a69c-6ffe00239016.jpg" />.</p><p>Let<img src="22-7401296\eccb22a2-57a6-4faa-ab71-d4bb633c5ced.jpg" />, then</p><p><img src="22-7401296\8ec7ead1-68ae-422e-b166-a1408078e899.jpg" /></p><p>Since<img src="22-7401296\2dbd227e-e7d3-448f-9ff5-755202607251.jpg" />is nonempty compact set, then<img src="22-7401296\ac22b6ce-16b7-4e4b-b587-6b8f29618453.jpg" /> such that</p><p><img src="22-7401296\097d777a-c6f1-42d7-b8c0-8dbaf34c20fb.jpg" />;</p><p><img src="22-7401296\ce4c7cee-9cfc-4497-96a5-7f16f14fc46f.jpg" />is a nonempty compact set, then <img src="22-7401296\07c3006b-adfa-454f-a993-71ed98cafa85.jpg" />such that<img src="22-7401296\9abab05c-5905-45ff-9b60-1b31195da4c3.jpg" />.</p><p><img src="22-7401296\7b40002f-5ec2-42d3-88d2-ba54f9bf010b.jpg" /></p><p>from (a) (b) and Equation (1)</p><p>Now</p><p><img src="22-7401296\f0754f2a-87e2-4fb2-814c-6d3a6b0bc95c.jpg" /></p><p>So<img src="22-7401296\6af2928e-1d77-4f62-b1a8-7db949c0f187.jpg" />, we have just proved that <img src="22-7401296\648c999f-309d-4896-8022-fc75c24968a6.jpg" /> for every<img src="22-7401296\8f29a6d3-5e00-435d-8ace-1ea00f67e43d.jpg" />. Thus <img src="22-7401296\22cbe88f-b94e-4849-8eb8-2b8f12ed6efa.jpg" /> is an upper bound in <img src="22-7401296\dfb8534b-0557-481f-bfc0-df3f579201a6.jpg" /> for the family <img src="22-7401296\dbfef6ae-a2d1-4414-9431-1aebc28d4c41.jpg" /> and hence by Zorn’s Lemma, there is a maximal element in<img src="22-7401296\8165bfcb-7592-405f-bca2-530b0c974010.jpg" />, say<img src="22-7401296\6088f232-af78-4eaf-b6f1-5326a274a8fd.jpg" />. There exists <img src="22-7401296\4ed72d8e-b550-459b-a65e-c51853a475ad.jpg" /> such that<img src="22-7401296\a4db4287-2985-4d14-9d86-5c14b72d5d55.jpg" />.</p><p>Suppose</p><p><img src="22-7401296\591c1759-97cb-46a6-8ce1-fed11906f6da.jpg" />.</p><p>Since <img src="22-7401296\2925befb-052c-404c-92b5-37d4e3ea2d69.jpg" /> are nonempty compact sets, then <img src="22-7401296\b0cfaa3e-9fb6-4c8f-a425-0f94a5b14812.jpg" /> such that</p><disp-formula id="scirp.28422-formula70154"><label>(2)</label><graphic position="anchor" xlink:href="22-7401296\ee8393f9-894c-46be-9278-0b1ee2375452.jpg"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.28422-formula70155"><label>(3)</label><graphic position="anchor" xlink:href="22-7401296\6f67e768-7291-4e1f-b610-220431afbc93.jpg"  xlink:type="simple"/></disp-formula><p>From (b), (c) and Equation (2), we have</p><disp-formula id="scirp.28422-formula70156"><label>(4)</label><graphic position="anchor" xlink:href="22-7401296\a915bbfb-8e71-4790-bdeb-7b94601c032e.jpg"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.28422-formula70157"><label>(5)</label><graphic position="anchor" xlink:href="22-7401296\29dbc580-f794-4180-8501-a241cf828821.jpg"  xlink:type="simple"/></disp-formula><p>From (b), (c) and Equations (2)-(5)</p><disp-formula id="scirp.28422-formula70158"><label>(6)</label><graphic position="anchor" xlink:href="22-7401296\55f3e7ce-a437-4d39-a0d6-6cd9866e5a11.jpg"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.28422-formula70159"><label>(7)</label><graphic position="anchor" xlink:href="22-7401296\f8ccba88-4b97-4606-9f5a-d7ae4becb9d7.jpg"  xlink:type="simple"/></disp-formula><p>From Equation (4) and Equation (6) we have</p><disp-formula id="scirp.28422-formula70160"><label>(8)</label><graphic position="anchor" xlink:href="22-7401296\8400ced6-ea54-45fd-bc92-f5c2290fdd1a.jpg"  xlink:type="simple"/></disp-formula><p>From Equation (5) and Equation (7) we have</p><disp-formula id="scirp.28422-formula70161"><label>(9)</label><graphic position="anchor" xlink:href="22-7401296\1fa27c30-ebea-4ffe-9050-f74518fad6c2.jpg"  xlink:type="simple"/></disp-formula><p>If</p><p><img src="22-7401296\feb03451-38b9-48ae-9d76-125559a72e95.jpg" /></p><p>Then from Equation (8),<img src="22-7401296\d85c11d3-d8a4-42df-bed0-442ff738af9b.jpg" />. Hence<img src="22-7401296\17fd2374-ffde-4b92-bcb3-83b6c04fcbbf.jpg" />. It is a contradiction to the maximality of <img src="22-7401296\d2157e2e-5ead-4963-a4aa-3136c7eb0173.jpg" /> in<img src="22-7401296\3844396f-1d72-4317-9bf8-853e11ef2feb.jpg" />, since <img src="22-7401296\30117ca6-8e5b-4c5d-9270-7ffb2acdb166.jpg" /></p><p>If</p><p><img src="22-7401296\8454ccd4-5f4c-442e-9e68-6d259d840b2c.jpg" /></p><p>Then from Equation (9),<img src="22-7401296\436bcb19-e9e9-4969-a30c-8149d43ab0fa.jpg" />. Hence<img src="22-7401296\568e7240-9b7e-43f2-acbe-ff30c6c05176.jpg" />.It is a contradiction to the maximality of <img src="22-7401296\3bea25ac-f6a5-4127-9dff-520f9b639238.jpg" /> in<img src="22-7401296\d8a7caa6-e4d3-4461-a2e4-f811ce75428b.jpg" />, since<img src="22-7401296\36d29841-7bf3-4c35-ae8a-5f8ef4b50535.jpg" />.</p><p>So</p><disp-formula id="scirp.28422-formula70162"><label>(10)</label><graphic position="anchor" xlink:href="22-7401296\249b039d-6ab3-4237-8967-2a835d8eeb1a.jpg"  xlink:type="simple"/></disp-formula><p>In addition,<img src="22-7401296\8f4ec397-4f05-4a32-a894-d009c9a5639c.jpg" />.</p><p>Using (b), (c) and Equation (10), we obtain</p><p><img src="22-7401296\11d43b51-5fa7-4e43-8be2-90ea8954de5f.jpg" /></p><p>Hence<img src="22-7401296\aa3afc2b-4ebe-43b9-abea-0f142579e15a.jpg" />.</p><p>Then the proof is completed.</p><p>Theorem 3.2 Let <img src="22-7401296\8e6338e4-f90e-46f0-bd2d-ee8664493df9.jpg" /> be an ultra metric space. Let <img src="22-7401296\6db5f5f0-3568-4e8a-89b6-bb74cb5097c2.jpg" /> be a pair of multi-valued maps and <img src="22-7401296\1912fdc0-8f3e-4d70-943e-8a093e6136bf.jpg" /> be a single-valued maps satisfying</p><p>(a) <img src="22-7401296\de6c90e8-146a-43eb-98b2-769944ba7641.jpg" />is spherically complete;</p><disp-formula id="scirp.28422-formula70163"><label>(b)</label><graphic position="anchor" xlink:href="22-7401296\a083b7f7-cf49-4338-9e09-7beadc2a2ab8.jpg"  xlink:type="simple"/></disp-formula><p>for all<img src="22-7401296\6bd8a85a-4ab2-4057-aa5d-722b7a3aa6c4.jpg" />,with<img src="22-7401296\e83352d1-91cd-4405-8004-11b457d60fb3.jpg" />;</p><p>(c)<img src="22-7401296\a823940c-b3d2-422f-91ee-c51cfa7bc9c6.jpg" />;</p><p>(d)<img src="22-7401296\bec6750f-8685-4d02-b141-d0d1603b4624.jpg" />.</p><p>Then <img src="22-7401296\922642de-591d-4f94-beb6-54cd6628b6ea.jpg" /> and <img src="22-7401296\d2e1f9ac-c51f-451f-a4b3-17f5ae30f0ab.jpg" /> have a coincidence point in<img src="22-7401296\6bdd7c5f-3e66-4298-89ad-c54ea0cc9f02.jpg" />.</p><p>Moreover, if <img src="22-7401296\c6099a86-7211-4c24-bbdd-b5e4547a24b3.jpg" /> and<img src="22-7401296\ddd13b74-63b0-4071-8671-37decb379572.jpg" />, <img src="22-7401296\0faa48be-8e52-480e-86ea-1e1a369774de.jpg" />and <img src="22-7401296\60467b9c-1955-4659-85b2-f36ebf335b26.jpg" /> are coincidentally commuting at <img src="22-7401296\d4781e42-7664-497b-8b27-c6984a6b79d2.jpg" /> and<img src="22-7401296\0ed00ac1-73fc-4e28-8ec5-6dc86da26431.jpg" />, then <img src="22-7401296\cba547af-7110-405d-86e6-5653cb7a7d6d.jpg" /> and <img src="22-7401296\fe9ff265-b96c-4f61-acf7-1ac323cc0f6f.jpg" /> have a common fixed point in<img src="22-7401296\2f0e41f6-4cdd-4b5e-9226-7ad41063a056.jpg" />.</p><p>Proof. If <img src="22-7401296\274c940d-13a7-4897-9bf1-214bd3d16beb.jpg" /> in Theorem 2.1, we obtain that there exist points <img src="22-7401296\f71791ca-988c-488a-a701-2ef10c5fcf08.jpg" /> and <img src="22-7401296\4115bfbc-33a1-4817-bd5c-832df6b369c2.jpg" /> in <img src="22-7401296\a1d9056d-227a-40c2-9015-a6f25fc6dc6e.jpg" /> such that</p><p><img src="22-7401296\db71b56d-11a2-480d-beca-8708c92980cc.jpg" />.</p><p>As<img src="22-7401296\11ad9cc9-6048-4b4c-9210-8cdfb80a8545.jpg" />, <img src="22-7401296\dbf442d9-33d4-4ab5-afa1-9628c2fe5c8e.jpg" />and <img src="22-7401296\cbce702d-596e-44a0-ab27-dbecfc4e6760.jpg" /> ipipare coincidentally commuting at <img src="22-7401296\1d17ae1b-9ce8-401c-a04f-3406131ee238.jpg" /> and<img src="22-7401296\2d6ee3e7-afd9-47d6-ad84-bd149b814ffa.jpg" />.</p><p>Write<img src="22-7401296\e6edf09d-1351-400e-ba08-4388b8b22bc0.jpg" />, then<img src="22-7401296\69ac8c04-5815-49a3-befa-944aa043959a.jpg" />.</p><p>Then we have</p><p><img src="22-7401296\4fbaa4d9-8a74-4598-8381-a15cf9af5b82.jpg" /></p><p>and</p><p><img src="22-7401296\b641b567-dacc-443b-aa55-5042299adaf0.jpg" />.</p><p>Now, since also<img src="22-7401296\a52031f3-0e97-4f4b-a6df-0f34c474242b.jpg" />, <img src="22-7401296\6c625ced-0df9-4473-a366-ce53987dbacb.jpg" />and <img src="22-7401296\838b2742-2f57-4ecd-839b-44b62099aa5e.jpg" /> are coincidentally commuting at <img src="22-7401296\e8c9c4e5-bbff-4c13-b208-20a77666e6a3.jpg" /> and<img src="22-7401296\03a2f777-bef1-4017-9537-791571e6c3eb.jpg" />, so we obtain</p><p><img src="22-7401296\e1a2270e-e529-48f5-8b15-04c9e44eaf0b.jpg" />.</p><p>Thus, we have proved that<img src="22-7401296\7081c72a-cdb7-4ccd-923d-fa9a6a669398.jpg" />, that is, <img src="22-7401296\9b4aea70-92f3-406a-85ca-367b1945e27f.jpg" />is a common fixed point of <img src="22-7401296\905c4f1c-f9a5-4455-a1f7-067fe1e9687c.jpg" /> and<img src="22-7401296\c21f4e35-11f6-4a7a-a6a7-55769aea4f3b.jpg" />.</p><p>Corollary 3.3 Let <img src="22-7401296\07e1547e-21c1-4cdc-9388-f4b9d91817bf.jpg" /> be a spherically complete ultra metric space. Let <img src="22-7401296\3028fcf7-42c6-4abf-a349-d03dfd91d46c.jpg" /> be a pair of multi-valued maps satisfying</p><p>(a) <img src="22-7401296\83a8f0bd-4a26-4bac-855d-398a05068830.jpg" />for all<img src="22-7401296\2c8dfe4c-a01e-44d0-b23d-4a0538724437.jpg" />,with<img src="22-7401296\36fa8911-561f-4a0a-b239-fde83701634b.jpg" />;</p><p>(b)<img src="22-7401296\c2a17354-9519-428f-a357-e3d2c762250e.jpg" />.</p><p>Then, there exists a point<img src="22-7401296\a306b8b7-c38a-418f-96f2-735e0326db61.jpg" />in<img src="22-7401296\0e3813c9-ae11-4c6b-9741-7ebe026afa0a.jpg" />such that <img src="22-7401296\24118268-a467-46bd-a703-cfdde91623b8.jpg" /> and<img src="22-7401296\a56157c0-4b50-44d5-83d0-5143fe68e1a2.jpg" />.</p><p>Remark 1 If <img src="22-7401296\59821997-5ed7-4600-b1ea-0f6e69b6e7ce.jpg" /> in Corollary 3.3, then we obtain the Theorem of Ljiljana Gajic [<xref ref-type="bibr" rid="scirp.28422-ref6">6</xref>].</p><p>Remark 2 If in Theorem 3.1, <img src="22-7401296\973d967c-862b-49e9-8882-c46765db5e46.jpg" />, we obtain Theorem 9 of K. P. R. Rao at [<xref ref-type="bibr" rid="scirp.28422-ref7">7</xref>].</p><p>Remark 3 If<img src="22-7401296\bc370bd0-a6cc-4027-b726-78b3d4661f8a.jpg" />and<img src="22-7401296\315c4f9f-0277-402d-a68e-ccc7b1dfb48d.jpg" />in Theorem 3.1 are single-valued maps, then: 1) we obtain the results of K. P. R. Rao [<xref ref-type="bibr" rid="scirp.28422-ref4">4</xref>]; 2)<img src="22-7401296\61498efe-7ff9-48d8-9d7a-190378d8dfc9.jpg" />, we obtain the result of Ljiljana Gajic [<xref ref-type="bibr" rid="scirp.28422-ref3">3</xref>]; 3)<img src="22-7401296\1f25dfe1-82dd-4a39-adb0-b7323cbfee2d.jpg" />, then, we obtain Theorem 4 of K. P. R. Rao at [<xref ref-type="bibr" rid="scirp.28422-ref7">7</xref>].</p></sec><sec id="s4"><title>4. Conclusion</title><p>In this paper, we get coincidence point theorems and common fixed point theorems for two pair of multi-valued and single-valued maps satisfying different contractive conditions on spherically complete ultra metric space, which is generalized results of [3-7].</p></sec><sec id="s5"><title>5. Acknowledgements</title><p>Foundation item: Science and Technology Foundation of Educational Committee of Tianjin (11026177).</p></sec><sec id="s6"><title>REFERENCES</title></sec><sec id="s7"><title>NOTES</title></sec></body><back><ref-list><title>References</title><ref id="scirp.28422-ref1"><label>1</label><mixed-citation publication-type="other" xlink:type="simple">A. C. M. van Roovij, “Non Archimedean Functional Analysis,” Marcel Dekker, New York, 1978.</mixed-citation></ref><ref id="scirp.28422-ref2"><label>2</label><mixed-citation publication-type="other" xlink:type="simple">C. Petalas and F. Vidalis, “A Fixed Point Theorem in Non-Archimedaen Vector Spaces,” Proceedings of the American Mathematics Society, Vol. 118, 1993, pp. 819-821. doi:10.1090/S0002-9939-1993-1132421-2</mixed-citation></ref><ref id="scirp.28422-ref3"><label>3</label><mixed-citation publication-type="other" xlink:type="simple">L. Gajic, “On Ultra Metric Spaces,” Novi Sad Journal of Mathematics, Vol. 31, No. 2, 2001, pp. 69-71.</mixed-citation></ref><ref id="scirp.28422-ref4"><label>4</label><mixed-citation publication-type="other" xlink:type="simple">K. P. R. Rao, G. N. V. Kishore and T. Ranga Rao, “Some Coincidence Point Theorems in Ultra Metric Spaces,” International Journal of Mathematical Analysis, Vol. 1, No. 18, 2007, pp. 897-902.</mixed-citation></ref><ref id="scirp.28422-ref5"><label>5</label><mixed-citation publication-type="other" xlink:type="simple">J. Kubiaczyk and A. N. Mostafa, “A Multi-Valued Fixed Point Theorem in Non-Archimedean Vector Spaces,” Novi Sad Journal of Mathematics, Vol. 26, No. 2, 1996, pp. 111-116.</mixed-citation></ref><ref id="scirp.28422-ref6"><label>6</label><mixed-citation publication-type="other" xlink:type="simple">L. Gajic, “A Multivalued Fixed Point Theorem in Ultra Metric Spaces,” Matematicki Vesnik, Vol. 54, No. 3-4, 2002, pp. 89-91.</mixed-citation></ref><ref id="scirp.28422-ref7"><label>7</label><mixed-citation publication-type="other" xlink:type="simple">K. P. R. Rao and G. N. V. Kishore, “Common Fixed Point Theorems in Ultra Metric Spaces,” Journal of Mathematics, Vol. 40, 2008, pp. 31-35.</mixed-citation></ref><ref id="scirp.28422-ref8"><label>8</label><mixed-citation publication-type="other" xlink:type="simple">B. Damjanovic, B. Samet and C. Vetro, “Common Fixed Point Theorem for Multi-Valued Maps,” Acta Mathematica Scientia, Vol. 32, No. 2, 2012, pp. 818-824.  
doi:10.1016/S0252-9602(12)60063-0</mixed-citation></ref></ref-list></back></article>