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a(n) has property that for any finite field F of odd characteristic and order >= a(n) there is no bijective map m: M_n(F)->M_n(F) such that permanent A = det m(A).
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%I #11 Sep 28 2014 08:10:27

%S 3,43,79,121,167,223,289,367,449,541,641,751,877,997,1151,1279,1433,

%T 1597

%N a(n) has property that for any finite field F of odd characteristic and order >= a(n) there is no bijective map m: M_n(F)->M_n(F) such that permanent A = det m(A).

%H Alexander Guterman, <a href="http://www.law05.si/law14/presentations/Guterman.pdf">PĆ³lya permanent problem: 100 years after</a>, 2014.

%Y Cf. A059375.

%K nonn,more

%O 3,1

%A _N. J. A. Sloane_, Sep 17 2014