Rational digit systems over finite fields and Christol's Theorem

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作者：Manuel Joseph C. Loquias^a ; ^b ; ^{mjcloquias@math.upd.edu.ph" class="auth_mail" title="E-mail the corresponding author} ; Mohamed Mkaouar^c ; ^{mohamed.mkaouar@fss.rnu.tn" class="auth_mail" title="E-mail the corresponding author} ; Klaus Scheicher^d ; ^{klaus.scheicher@boku.ac.at" class="auth_mail" title="E-mail the corresponding author} ; Jö ; rg M. Thuswaldner^a ; ^{joerg.thuswaldner@unileoben.ac.at" class="auth_mail" title="E-mail the corresponding author}
关键词：primary ; 11A63 ; 68Q70 ; secondary ; 11B85
刊名：Journal of Number Theory
出版年：2017
出版时间：February 2017
年：2017
卷：171
期：Complete
页码：358-390
全文大小：621 K

文摘

Let class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si1.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=8f0bc7ea82a970bfd09c55d99f04e746" title="Click to view the MathML source">P,Q∈F_q[X]∖{0}class="mathContainer hidden">class="mathCode">

croll"> P, Q \in {ck">F}_{q} chy="false">[X chy="false">] ∖ chy="false">{0 chy="false">}

be two coprime polynomials over the finite field class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si124.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=b9264fbb0cd6ddc57c9e30dc465fe92f" title="Click to view the MathML source">F_qclass="mathContainer hidden">class="mathCode">

croll"> {ck">F}_{q}

with class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si11.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=4d8dafdf022fb32645b67ac6b75697f2" title="Click to view the MathML source">deg⁡P>deg⁡Qclass="mathContainer hidden">class="mathCode">

croll"> \deg P > \deg Q

. We represent each polynomial w over class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si124.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=b9264fbb0cd6ddc57c9e30dc465fe92f" title="Click to view the MathML source">F_qclass="mathContainer hidden">class="mathCode">

croll"> {ck">F}_{q}

class="formula" id="fm0010">

class="mathml">class="mathmlsrc">ce" class="mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si4.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=bfe921a0ddb5492dcfa3fd3cbd142085">class="imgLazyJSB inlineImage" height="47" width="126" alt="View the MathML source" title="View the MathML source" src="/sd/grey_pxl.gif" data-inlimgeid="1-s2.0-S0022314X16302049-si4.gif">cript>cal-align:bottom" width="126" alt="View the MathML source" title="View the MathML source" src="http://origin-ars.els-cdn.com/content/image/1-s2.0-S0022314X16302049-si4.gif">cript>class="mathContainer hidden">class="mathCode">

croll"> w = \sum_{i = 0}^{k} c> s_{i} Q c> {chy="true">(c> P Q c> chy="true">)}^{i}

class="temp" src="/sd/blank.gif">

using a rational base class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si5.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=e18775548425ff80b18ef905fe9327bb" title="Click to view the MathML source">P/Qclass="mathContainer hidden">class="mathCode">

croll"> P chy="false">/ Q

and digits class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si6.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=3c0274cac2d9c567c3d57a4aed0d93ac" title="Click to view the MathML source">s_i∈F_q[X]class="mathContainer hidden">class="mathCode">

croll"> s_{i} \in {ck">F}_{q} chy="false">[X chy="false">]

satisfying class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si644.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=f8313c89bc82ca7a6cb85f0c012a3c6e" title="Click to view the MathML source">deg⁡s_i<deg⁡Pclass="mathContainer hidden">class="mathCode">

croll"> \deg s_{i} < \deg P

. Digit expansions of this type are also defined for formal Laurent series over class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si124.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=b9264fbb0cd6ddc57c9e30dc465fe92f" title="Click to view the MathML source">F_qclass="mathContainer hidden">class="mathCode">

croll"> {ck">F}_{q}

. We prove uniqueness and automatic properties of these expansions. Although the ω -language of the possible digit strings is not regular, we are able to characterize the digit expansions of algebraic elements. In particular, we give a version of Christol's Theorem by showing that the digit string of the digit expansion of a formal Laurent series is automatic if and only if the series is algebraic over class="mathmlsrc">class="formulatext stixSupport mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0022314X16302049&_mathId=si193.gif&_user=111111111&_pii=S0022314X16302049&_rdoc=1&_issn=0022314X&md5=ab21ee811c9f8af161d6673fc9a73037" title="Click to view the MathML source">F_q[X]class="mathContainer hidden">class="mathCode">

croll"> {ck">F}_{q} chy="false">[X chy="false">]

. Finally, we study relations between digit expansions of formal Laurent series and a finite fields version of Mahler's 3/2-problem.

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