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Numbers equal to the sum of their aliquot parts, each of them decreased by 4.
8

%I #20 May 19 2018 17:41:47

%S 350,608,113408,484864,1067552,8198144,14824850,169026688,1080074368,

%T 149775190016

%N Numbers equal to the sum of their aliquot parts, each of them decreased by 4.

%C Searched up to n = 10^12.

%C From _Giovanni Resta_, May 11 2018: (Start)

%C If p = 2^(1+t) + (1+2*t)*k - 1 is a prime, for some t > 0 and k even, then x = 2^t*p is in the sequence where k is the value by which the sum of aliquot parts is increased.

%C In this sequence k = -4; for t = 20 we get 2198850240512, which is a term greater than 149775190016, but this does not exclude the existence of other intermediate terms following a different solution pattern.

%C In fact, there could be also sporadic solutions of the type x = 2^t*r*q, where r and q are prime and for which no closed form is known. E.g. for k = -4 we have x = 2^31*4294967357*297528134446815421.

%C To find them, since d(n) = 4*(t+1) and sigma(n) = (2^(t+1)-1)*(1+r)*(1+q), the relation 2*n = sigma(n) + k*(d(n)-1) becomes 2^(t+1)*r*q = (2^(t+1)-1)*(1+r)*(1+q) + k*(4*t+3), which, for fixed t and k, is a quadratic Diophantine equation in r and q that could admit solutions with r and q prime.

%C (End)

%C Terms using odd values of k seem very hard to find. Up to n = 10^12, only three such terms are known: 2, 98, and 8450, for k = 1, 5, and -7, respectively.

%e Aliquot parts of 350 are 1, 2, 5, 7, 10, 14, 25, 35, 50, 70, 175 and (1-4) + (2-4) + (5-4) + (7-4) + (10-4) + (14-4) + (25-4) + (35-4) + (50-4) + (70-4) + (175-4) = 350.

%p with(numtheory): P:=proc(q,k) local n;

%p for n from 1 to q do if 2*n=sigma(n)+k*(tau(n)-1) then print(n);

%p fi; od; end: P(10^12,-4);

%t With[{k = -4}, Select[Range[10^6], DivisorSum[#, # + k &] - (# + k) == # &] ] (* _Michael De Vlieger_, May 14 2018 *)

%Y Cf. A000005, A000203, A000396, A304276, A304277, A304278, A304279, A304280, A304281, A304283, A304284.

%K nonn,hard,more

%O 1,1

%A _Paolo P. Lava_, _Giovanni Resta_, May 11 2018