Hi, and welcome to the blog tour for The Bells of Times Square! This book is close to my heart– if you read the extra front and back matter in the story, you will see that I drew inspiration from my grandparents and their roles in WWII. There was a lot of research involved here and also an unusual romance. I hope you enjoy this stop on the tour, and don’t forget to enter the Rafflecopter below for the giveaway of a $10 Riptide store credit and a signed copy of The Bells of Times Square! Feel free to comment, or to contact me at any of my links below–I’d love to hear from you!
Every New Year’s Eve since 1946, Nate Meyer has ventured alone to Times Square to listen for the ghostly church bells he and his long-lost wartime lover vowed to hear together. This year, however, his grandson Blaine is pushing Nate through the Manhattan streets, revealing his secrets to his silent, stroke-stricken grandfather.
When Blaine introduces his boyfriend to his beloved grandfather, he has no idea that Nate holds a similar secret. As they endure the chilly death of the old year, Nate is drawn back in memory to a much earlier time . . . and to Walter.
Long before, in a peace carefully crafted in the heart of wartime tumult, Nate and Walter forged a loving home in the midst of violence and chaos. But nothing in war is permanent, and now all Nate has is memories of a man his family never knew existed. And a hope that he’ll finally hear the church bells that will unite everybody—including the lovers who hid the best and most sacred parts of their hearts.
About Amy Lane
Amy Lane exists happily with her noisy family in a crumbling suburban crapmansion, and equally happily with the surprisingly demanding voices who live in her head.
She loves cats, movies, yarn, pretty colors, pretty men, shiny things, and Twu Wuv, and despises house cleaning, low fat granola bars, and vainglorious prickweenies.
She can be found at her computer, dodging housework, or simultaneously reading, watching television, and knitting, because she likes to freak people out by proving it can be done.