CustomCC0-1.0#cpq0131550

Graph Degree Parity Transform

Summary

•Phase 6 / graph/degree-parity
•Reasoning-first competitive programming drill

Problem Description

Given an undirected graph with n nodes and m edges, determine the minimal number of edge additions needed so that all nodes have even degree. Output -1 if not possible. How to read this problem in plain language: - This is a Phase 6 reasoning drill focused on graph/degree-parity. - Typical lenses to test first: graph, parity, degree. - Constraints reminder: 1 ≤

n \leq 1 0^{5}

, 0 ≤

m \leq 2 \times 1 0^{5}

Mini examples for mental simulation: 1) Boundary example: Describe why this case is tricky. Explain expected behavior and why naive logic may fail. 2) Adversarial example: Adversarial case where naive greedy/local decision looks correct but fails globally. Lite-mode writing target: - Write 1~2 observations that shrink the search space. - Name one final algorithm and state target complexity explicitly. - Validate with at least 2 edge cases and one hand simulation.

Constraints

•
1 ≤ $n \leq 1 0^{5}$ , 0 ≤ $m \leq 2 \times 1 0^{5}$

Analysis

Key Insight

Use this hint to refine your reasoning. This step should reduce search space or formalize correctness. State why this insight changes your algorithm choice.

graphparitydegreegreedy