Epic Games has relaunched its holiday giveaway of free games.
In an attempt to dethrone Steam, the owner of the PC platform is giving away a different free game every day.
If you have an Epic Games account, simply visit the PC store and claim your free game.
It all started with Yu Suzuki’s crowdfunding hit Shenmue 3, followed by the roguelike action game Neon Abyss.
Each game will be available to download for 24 hours, and new games will be added at 4pm GMT every day.
Neon Abyss, for example, will be available until 4pm UK time on December 18, when it will be replaced by a new game.
The free games giveaway is accompanied by an extensive Christmas offer, with discounts on dozens of games.
Additionally, Epic Games is giving all customers a £ 10 coupon, which can be used on any game that costs £ 13.99 or more.
Using the coupon in the holiday sale games means you can buy Back 4 Blood for just £ 19.99.
Battlefield 2042 has dropped to £ 32.99 on the offer, or £ 22.99 if you also use the coupon.
You can get Alan Wake Remastered for just £ 9.99 with the coupon, or Disco Elysium for just £ 5.74.
£ 10 coupons expire on 6th January so be sure to spend yours before time runs out.
As for the free-to-play giveaway, Neon Abyss is described as a “frenzied, roguelike action platformer where you run and shoot up to the Abyss.”
Combining furious run-and-gun action and deep, roguelike mechanics, Neon Abyss faces you as a member of the ‘Grim Squad’, a task force created by Hades himself to infiltrate the Abyss and defeat the New Gods.
“Death is not the end, as each time you die, you will feel more empowered than before.
“With each race, you will be able to unlock new rooms, items, bosses, special rules, and even new endings! This means that each dungeon is unique and expandable, and is tailored to your own specific play style.
“As you progress through each dungeon, random item drops will be key to helping you infiltrate the Abyss and these passive effects can stack between each item. No limit to how many can be applied, a wide variety of combinations will do that each race is unique. “