# Exercises on Reductions

Exercises on Reductions

1. Prove that the following two problems have the same complexity by giving a linear-time reductions between the two.

3-SUM: given n integers x1, ..., xn, are there three distinct integers i, j, and k such that xi + xj + xk = 0.

3-SUM-PLUS: given n integers x1, ..., xn, and an integer b are there three distinct integers i, j, and k such that xi + xj + xk = b.

a. Give a linear-time reduction from 3-SUM to 3-SUM-PLUS. To demonstrate your reduction, give the 3-SUM-PLUS instance that you would construct to solve the following 3-SUM instance: x1, ..., xn.

b. Give a linear-time reduction from 3-SUM-PLUS to 3-SUM. To demonstrate your reduction, give the 3-SUM instance that you would construct to solve the following 3-SUM-PLUS instance: b, x1, ..., xn.

1. Prove that the following two problems have the same complexity by giving a linear-time reductions between the two.

3-SUM: given n integers x1, ..., xn, are there three distinct integers i, j, and k such that xi + xj + xk = 0.

3-SUM-PLUS: given n integers x1, ..., xn, and an integer b are there three distinct integers i, j, and k such that xi + xj + xk = b.

a. Give a linear-time reduction from 3-SUM to 3-SUM-PLUS. To demonstrate your reduction, give the 3-SUM-PLUS instance that you would construct to solve the following 3-SUM instance: x1, ..., xn.

b. Give a linear-time reduction from 3-SUM-PLUS to 3-SUM. To demonstrate your reduction, give the 3-SUM instance that you would construct to solve the following 3-SUM-PLUS instance: b, x1, ..., xn.

You'll get a 19.0KB .DOCX file.