cp's OEIS Frontend

Definition requires "length > 2" because all numbers n > 2 are trivially represented as "11" in base n-1.

From Daniel Forgues, Nov 13 2009: (Start)

0 = 00 = 000 = 0000 = 00000 = 000000 = 0000000 = 00000000 = ... in any positional number representation (includes fixed base radix b > 1, mixed base radix with each b_i > 1, i >= 0, such as factorial and primorial based radix...)

The sequence definition should be read as:

Nonnegative integers that are repdigits with length > 2 in more than one fixed base radix b > 1.

Considering all fixed and mixed base radix would include many more nonnegative integers (but not the integers 1 to 6) which are repdigits with length > 2 in more than one radix. (End)

From Bernard Schott, Aug 08 2017: (Start)

In this sequence data, the first number which is repdigit, with length > 2, in more than two bases is the twelfth Mersenne number 4095 with four Brazilian representations: M_12 = 4095 = 111111111111_2 = 333333_4 = 7777_8 = (15 15 15)_16.

The Mersenne number M_15 is the first number which is repdigit in exactly three bases with M_15 = 32767 = 111111111111111_2 = 77777_8 = (31 31 31)_32.

Only two numbers are repunits in more than one base: the Mersenne primes 31 and 8191 (Examples and A119598).

Some numbers are once repunit and once multiple of a Brazilian prime such that Mersenne number M_9 = 511 = 7 * 73 = 111111111_2 = 7 * 111_8 = 777_8.

Some numbers are once repunit and once multiple of a composite repunit such that Mersenne number M_6 = 63 = 3 * 21 = 111111_2 = 3 * 111_4 = 333_4.

Some numbers are repdigits in two different bases: 546 = 666_9 = 222_16. (End)

As tau(m) = 2 * beta(m), the terms of this sequence are not squares. Indeed, there are 3 subsequences which realize a partition of this sequence (see examples):

1) Non-oblong composites which have only one Brazilian representation with three digits or more, they form A326387.

2) Oblong numbers that have exactly two Brazilian representations with three digits or more; these oblong integers are a subsequence of A167783 and form A326385.

3) Brazilian primes for which beta(p) = tau(p)/2 = 1, they are in A085104 \ {31, 8191}.

As tau(m) = 2 * (1 + beta(m)), the terms of this sequence are not squares. Indeed, there are 3 subsequences which realize a partition of this sequence (see examples):

1) Non-oblong composites which have no Brazilian representation with three digits or more, they form A326386.

2) Oblong numbers that have only one Brazilian representation with three digits or more. These oblong integers are a subsequence of A167782 and form A326384.

3) Non Brazilian primes, then beta(p) = tau(p)/2 - 1 = 0.

As tau(m) = 2 * (beta(m) - 2) , the terms of this sequence are not squares.

There are 2 subsequences which realize a partition of this sequence (see array in link and examples):

1) Non-oblong composites which have exactly three Brazilian representations with three digits or more, they are in A326389.

2) Oblong numbers that have exactly four Brazilian representations with three digits or more. These integers have been found through b-file of Rémy Sigrist in A290869. These oblong integers are a subsequence of A309062.

There are no primes that satisfy this relation.

As tau(m) = 2 * beta(m), the terms of this sequence are not squares.

The number of Brazilian representations of a non-oblong number m with repdigits of length = 2 is beta'(n) = tau(n)/2 - 1.

This sequence is the first subsequence of A326380: non-oblong composites which have only one Brazilian representation with three digits or more.

As tau(m) = 2 * (beta(m) - 3), the terms of this sequence are not squares.

The current known terms are non-oblong composites that have exactly four Brazilian representations with three digits or more; but, maybe, there exist oblong integers that have exactly five Brazilian representations with three digits or more.

As tau(m) = 2 * (beta(m) - 1), the terms of this sequence are not squares.

The number of Brazilian representations of a non-oblong number m with repdigits of length = 2 is beta'(n) = tau(n)/2 - 1.

This sequence is the first subsequence of A326381: non-oblong composites which have exactly two Brazilian representations with three digits or more.

Some Mersenne numbers belong to this sequence: M_6, M_8, M_9, M_10, M_14, ...

The number of Brazilian representations of a non-oblong number m with repdigits of length = 2 is beta'(m) = tau(m)/2 - 1. So, as here beta"(m) = 3, beta(m) = tau(m)/2 + 2 where beta(m) is the number of Brazilian representations of m. So, this sequence is the first subsequence of A326382.

As tau(m) = 2 * (beta(m) - 2) is even, the terms of this sequence are not squares.

Some Mersenne numbers belong to this sequence: M_15 = a(1), M_16 = a(2), M_21 = a(4), M_27 = a(26), ...

The number of Brazilian representations of an oblong number m with repdigits of length = 2 is beta'(n) = tau(n)/2 - 2.

This sequence is the second subsequence of A326379: oblong numbers that have only one Brazilian representation with three digits or more.

Prime 2 is oblong and satisfies also beta(2) = tau(2)/2 - 1 = 0 but non-Brazilian primes are in A220627.

The number of Brazilian representations of a non-oblong number m with repdigits of length = 2 is beta'(m) = tau(m)/2 - 1. So, as here beta"(m) = r with r >= 4, beta(m) = tau(m)/2 + k with k >= 3 where beta(m) is the number of Brazilian representations of m.

As tau(m) = 2 * (beta(m) - k) is even, the terms of this sequence are not squares.

The terms which have exactly four Brazilian representations with three digits or more form the first subsequence of A326383. Indeed, for the given terms, the number of bases is 4, except for a(8) and a(15) where this number of bases is respectively 5 and 6 (see examples).

Some Mersenne numbers belong to this sequence: M_12 = a(1), M_18 = a(2), M_20 = a(5), M_24 = a(8), M_28 = a(13), M_32, ...